Continuum families of non-displaceable Lagrangian tori in (CP1)2m

Abstract

We construct a family of Lagrangian tori ns ⊂ (CP1)n, s ∈ (0,1), where n1/2 = n, is the monotone twist Lagrangian torus described by Chekanov-Schlenk. We show that for n = 2m and s 1/2 these tori are non-displaceable. Then by considering k1s1 × ·s × klsl × (S2eq)n - Σi ki ⊂ (CP1)n, with si ∈ [1/2,1) and ki ∈ 2Z>0, Σi ki n we get several l-dimensional families of non-displaceable Lagrangian tori. We also show that there exists partial symplectic quasi-states ζbses and linearly independent homogeneous Calabi quasimorphims μbses or which 2ms are ζbses-superheavy and μbses-superheavy. We also prove a similar result for (CP2 3CP2, ωε), where \ωε; 0 < ε < 1\ is a family of symplectic forms in CP2 3CP2, for which ω1/2 is monotone.